"Kohn-Nirenberg phenomenon; convexifiability; generalized models; pseudoconvexity; finite type"@en . . "Generalized models and local invariants of Kohn-Nirenberg domains"@en . "Generalized models and local invariants of Kohn-Nirenberg domains" . . . . . "DE - Spolkov\u00E1 republika N\u011Bmecko" . "0025-5874" . . "2" . "259" . . "Generalized models and local invariants of Kohn-Nirenberg domains" . "The main obstruction for constructing holomorphic reproducing kernels of Cauchy type on weakly pseudoconvex domains is the Kohn-Nirenberg phenomenon, i.e., nonexistence of supporting functions and local nonconvexifiability. This paper gives an explicit verifiable characterization of weakly pseudoconvex but locally nonconvexifiable hypersurfaces of finite type in dimension two. It is expressed in terms of a generalized model, which captures local geometry of the hypersurface both in the complex tangential and nontangential directions. As an application we obtain a new class of nonconvexifiable pseudoconvex hypersurfaces with convex models." . . "Kol\u00E1\u0159, Martin" . . "1"^^ . "Matematische Zeitschrift" . "369057" . . . "P(GA201/05/2117)" . "1"^^ . "RIV/00216224:14310/08:00024798!RIV10-GA0-14310___" . . . "14310" . "000254261200004" . . "10"^^ . "The main obstruction for constructing holomorphic reproducing kernels of Cauchy type on weakly pseudoconvex domains is the Kohn-Nirenberg phenomenon, i.e., nonexistence of supporting functions and local nonconvexifiability. This paper gives an explicit verifiable characterization of weakly pseudoconvex but locally nonconvexifiable hypersurfaces of finite type in dimension two. It is expressed in terms of a generalized model, which captures local geometry of the hypersurface both in the complex tangential and nontangential directions. As an application we obtain a new class of nonconvexifiable pseudoconvex hypersurfaces with convex models."@en . . . "Generalized models and local invariants of Kohn-Nirenberg domains"@en . "RIV/00216224:14310/08:00024798" . "[C2AEA9E36F24]" . .